Freeman, D., & Jorgensen, T. (2015). Moving Beyond Brownies and Pizza. Teaching Children Mathematics, 21(7), 412-420. Retrieved June 28, 2015, from http://www.nctm.org/Publications/teaching-children-mathematics/2015/Vol21/Issue7/Moving-beyond-Brownies-and-Pizza/
Sunday, June 28, 2015
Moving Beyond Brownies and Pizza
Fractions are a hard concepts for students to understand. Students struggle with the idea
that fractions are numbers in and of themselves, not a composition of two, distinct, whole numbers. It is also likely
that students fail to recognize fractions as discrete numbers
because many math classes focus on understanding fractions as parts of wholes or parts of sets. The Common Core State Standards for Mathematics expect students to understand
arithmetic operations on fractions by the time
they leave fourth grade. Students may not be well prepared
to meet this expectation if they think about
fractions exclusively in terms of brownies, pizzas, or other area models. Students need to have opportunities to develop and explore their understanding
of fractions as measures, that is, understanding
both the relative size of fractions and understanding
how fractions measure specific intervals. The number line
model is a logical context within which these
explorations can take place. There are three goals when it comes to student comprehension of fractions. these include: building students’ understanding of fractions as
numbers with a definite magnitude, increasing students’ understanding of
measuring with fractions, and developing fraction number sense by avoiding
early introduction of traditional fraction
algorithms. Students are already familiar with the
number line from earlier grades, so they understands it as a concept, a representation, and
a tool. This is why teachers should use the number line as a way to help teach students fractions. Looking at a fourth grade classroom, for a period of five weeks, students completed many different groups of fraction problems. Students worked in pairs to compare the fractional quantities in each problem set. At first, many students used part-whole
concepts and diagrams to aid them in their
work. However, a number of students noticed
the linear context of each problem and began
shifting to linear representations. The teacher encouraged these efforts and asked students to share
their work during our whole-group discussion. The teacher continued to use the number line
exclusively during whole-group discussions. She displayed student-drawn number lines on
the walls and used them as reference points
during lessons. Within a few weeks, nearly all
the students began to demonstrate an understanding of fractions as actual quantities on the
number line. All students in this class made progress in relation to the three goals the teacher had set for them. Students began to build an understanding of
fractions as numbers with a definite magnitude. They were
beginning to understand how to use the number line as a tool for
representing fractions. In particular, students
were using ideas connected to the measure
subconstruct as a way to reason about the size
of fractions in comparison to other fractions
and to one whole. Finally, students were developing fraction number sense as they determined
the relative size of fractions without resorting to
traditional methods of comparison. I believe that using the number line is a great approach and allows students to better visualize the number. I will definitely be using a number line in my classroom!
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Thank you, Allison:)
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